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On some subsemigroups of the groups L1/s and L1/nieskończoność

Jabłoński W.

Demonstratio Mathematica

2006

Vol. 39, nr 2

305-316

The problem of determination of some class of geometric objects has been reduced about forty years ago to consideration of some subsemigroups of the differential group L1/s (cf. [1] and [6]). Over the last years many papers has been devoted the problem of determining of subsemigroups and subgroups of the group L/s (see among others (2], (3] and (5]-[15]). In this paper we are going to generalize the results from [5], [9] and (13] concerning determination of some form subsemigroups of the group L1/s.

Continuity of Lebesgue measurable solutions of a generalized Gołąb-Schinzel equation

Jabłońska E.

Demonstratio Mathematica

2006

Vol. 39, nr 1

91-96

Let k, n be positive integers and let f : Rn -> R be a solution of the functional equation f(x + f(x)ky)=f(x)f(y). We prove that, if there is a real positive a such that the set [x is an element of Rn : |f(x)| is an element of (0,a)} contains a subset of positive Lebesgue measure, then f is continuous. As a consequence of this we obtain that every Lebesgue measurable solution f : Rn -> R of the equation is continuous or equal zero almost everywhere (i.e. there is a set A C R of the Lebesgue measure zero with f(Rn \ A) = {0}).